Infinitely many solution for prescribed curvature problem on SN

Abstract

We consider the following prescribed scalar curvature problem on SN (*)\arrayl - SN u + N(N-2)2 u = K uN+2N-2 on SN, u >0 array. where K is positive and rotationally symmetric. We show that if K has a local maximum point between the poles then equation (*) has infinitely many non-radial positive solutions, whose energy can be made arbitrarily large.